Package word10-def: Definition of 10-bit words
Information
name | word10-def |
version | 1.19 |
description | Definition of 10-bit words |
author | Joe Hurd <joe@gilith.com> |
license | MIT |
provenance | HOL Light theory extracted on 2011-07-25 |
requires | bool natural list natural-divides |
show | Data.Bool Data.List Data.Word10 Data.Word10.Bits Number.Natural |
Files
- Package tarball word10-def-1.19.tgz
- Theory file word10-def.thy (included in the package tarball)
Defined Type Operator
- Data
- Word10
- word10
- Word10
Defined Constants
- Data
- Word10
- *
- +
- -
- <
- ≤
- ^
- ~
- and
- bit
- fromNatural
- modulus
- not
- or
- shiftLeft
- shiftRight
- toNatural
- width
- Bits
- compare
- fromWord
- normal
- toWord
- Word10
Theorems
⊦ ¬(modulus = 0)
⊦ ∀w. normal (fromWord w)
⊦ ∀w. w ≤ w
⊦ fromNatural modulus = 0
⊦ toWord [] = 0
⊦ toNatural (toWord []) = 0
⊦ modulus mod modulus = 0
⊦ 0 mod modulus = 0
⊦ ∀w. ¬(w < w)
⊦ ∀x. toNatural x < modulus
⊦ ~0 = 0
⊦ ∀x. ~~x = x
⊦ ∀x. fromNatural (toNatural x) = x
⊦ ∀w. toWord (fromWord w) = w
⊦ ∀w. length (fromWord w) = width
⊦ ∀n. n mod modulus < modulus
⊦ modulus = 2 ^ width
⊦ width = 10
⊦ ∀q. compare q [] [] ⇔ q
⊦ ∀x. x + 0 = x
⊦ ∀x. x ^ 1 = x
⊦ ∀x. 0 + x = x
⊦ ∀x. toNatural x div modulus = 0
⊦ ∀x. x ^ 0 = 1
⊦ ∀x. x * 0 = 0
⊦ ∀x. x + ~x = 0
⊦ ∀x. 0 * x = 0
⊦ ∀x. ~x + x = 0
⊦ ∀x. toNatural x mod modulus = toNatural x
⊦ ∀x. x * 1 = x
⊦ ∀x. 1 * x = x
⊦ ∀x. toNatural (fromNatural x) = x mod modulus
⊦ ∀l. normal l ⇔ length l = width
⊦ ∀x. ~x = fromNatural (modulus - toNatural x)
⊦ ∀w. not w = toWord (map (¬) (fromWord w))
⊦ ∀x y. x * y = y * x
⊦ ∀x y. x + y = y + x
⊦ ∀w. fromWord w = map (bit w) (interval 0 width)
⊦ ∀n. divides modulus n ⇔ n mod modulus = 0
⊦ ∀n. n < modulus ⇒ n mod modulus = n
⊦ ∀x. fromNatural x = 0 ⇔ divides modulus x
⊦ ∀n. n mod modulus mod modulus = n mod modulus
⊦ ∀x y. x < y ⇔ ¬(y ≤ x)
⊦ ∀x y. x - y = x + ~y
⊦ ∀x. ~x = 0 ⇔ x = 0
⊦ ∀l. toNatural (toWord l) < 2 ^ length l
⊦ ∀l. length l = width ⇔ fromWord (toWord l) = l
⊦ ∀x y. x < y ⇔ toNatural x < toNatural y
⊦ ∀x y. x ≤ y ⇔ toNatural x ≤ toNatural y
⊦ ∀x y. x * ~y = ~(x * y)
⊦ ∀x y. ~x * y = ~(x * y)
⊦ ∀w1 w2. fromWord w1 = fromWord w2 ⇔ w1 = w2
⊦ ∀x y. ~x = ~y ⇒ x = y
⊦ ∀x y. toNatural x = toNatural y ⇒ x = y
⊦ ∀w1 w2. fromWord w1 = fromWord w2 ⇒ w1 = w2
⊦ ∀w n. bit w n ⇔ odd (toNatural (shiftRight w n))
⊦ ∀m n. fromNatural (m ^ n) = fromNatural m ^ n
⊦ ∀x y. x + y = x ⇔ y = 0
⊦ ∀x y. y + x = x ⇔ y = 0
⊦ ∀x y. ~x + ~y = ~(x + y)
⊦ ∀w1 w2. compare ⊥ (fromWord w1) (fromWord w2) ⇔ w1 < w2
⊦ ∀w1 w2. compare ⊤ (fromWord w1) (fromWord w2) ⇔ w1 ≤ w2
⊦ ∀x n. x ^ suc n = x * x ^ n
⊦ ∀x1 y1. fromNatural (x1 * y1) = fromNatural x1 * fromNatural y1
⊦ ∀x1 y1. fromNatural (x1 + y1) = fromNatural x1 + fromNatural y1
⊦ ∀l. width ≤ length l ⇒ fromWord (toWord l) = take width l
⊦ ∀w1 w2. and w1 w2 = toWord (zipWith (∧) (fromWord w1) (fromWord w2))
⊦ ∀w1 w2. or w1 w2 = toWord (zipWith (∨) (fromWord w1) (fromWord w2))
⊦ ∀l n. shiftLeft (toWord l) n = toWord (replicate n ⊥ @ l)
⊦ ∀x y. toNatural (x * y) = toNatural x * toNatural y mod modulus
⊦ ∀x y. toNatural (x + y) = (toNatural x + toNatural y) mod modulus
⊦ ∀x y z. x * y * z = x * (y * z)
⊦ ∀x y z. x + y + z = x + (y + z)
⊦ ∀x y z. x + y = x + z ⇔ y = z
⊦ ∀x y z. y + x = z + x ⇔ y = z
⊦ ∀w1 w2 w3. w1 < w2 ∧ w2 < w3 ⇒ w1 < w3
⊦ ∀w1 w2 w3. w1 < w2 ∧ w2 ≤ w3 ⇒ w1 < w3
⊦ ∀w1 w2 w3. w1 ≤ w2 ∧ w2 < w3 ⇒ w1 < w3
⊦ ∀w1 w2 w3. w1 ≤ w2 ∧ w2 ≤ w3 ⇒ w1 ≤ w3
⊦ ∀n. 0 ^ n = if n = 0 then 1 else 0
⊦ ∀n. toWord (odd n :: fromWord (fromNatural (n div 2))) = fromNatural n
⊦ ∀w n. bit w n ⇔ odd (toNatural w div 2 ^ n)
⊦ ∀w n. shiftLeft w n = fromNatural (2 ^ n * toNatural w)
⊦ ∀w n. shiftRight w n = fromNatural (toNatural w div 2 ^ n)
⊦ ∀x y. fromNatural x = fromNatural y ⇔ x mod modulus = y mod modulus
⊦ ∀x y z. x * (y + z) = x * y + x * z
⊦ ∀x y z. (y + z) * x = y * x + z * x
⊦ ∀x m n. x ^ m * x ^ n = x ^ (m + n)
⊦ ∀m n. (m mod modulus) * (n mod modulus) mod modulus = m * n mod modulus
⊦ ∀m n. (m mod modulus + n mod modulus) mod modulus = (m + n) mod modulus
⊦ ∀l.
length l ≤ width ⇒
fromWord (toWord l) = l @ replicate (width - length l) ⊥
⊦ ∀q w1 w2.
compare q (fromWord w1) (fromWord w2) ⇔ if q then w1 ≤ w2 else w1 < w2
⊦ ∀w1 w2. (∀i. i < width ⇒ (bit w1 i ⇔ bit w2 i)) ⇒ w1 = w2
⊦ ∀l. 2 * toNatural (toWord l) + 1 < 2 ^ suc (length l)
⊦ ∀x y. x < modulus ∧ y < modulus ∧ fromNatural x = fromNatural y ⇒ x = y
⊦ ∀l n. bit (toWord l) n ⇔ n < width ∧ n < length l ∧ nth n l
⊦ ∀n.
fromNatural n =
toWord
(if n = 0 then [] else odd n :: fromWord (fromNatural (n div 2)))
⊦ ∀l.
fromWord (toWord l) =
if length l ≤ width then l @ replicate (width - length l) ⊥
else take width l
⊦ ∀h t.
toWord (h :: t) =
if h then shiftLeft (toWord t) 1 + 1 else shiftLeft (toWord t) 1
⊦ ∀h t.
toNatural (toWord (h :: t)) =
(2 * toNatural (toWord t) + if h then 1 else 0) mod modulus
⊦ ∀h t.
2 * toNatural (toWord t) + (if h then 1 else 0) < 2 ^ suc (length t)
⊦ ∀l n.
length l ≤ width ⇒
shiftRight (toWord l) n =
if length l ≤ n then toWord [] else toWord (drop n l)
⊦ ∀l n.
width ≤ length l ⇒
shiftRight (toWord l) n =
if width ≤ n then toWord [] else toWord (drop n (take width l))
⊦ ∀q h1 h2 t1 t2.
compare q (h1 :: t1) (h2 :: t2) ⇔
compare (¬h1 ∧ h2 ∨ ¬(h1 ∧ ¬h2) ∧ q) t1 t2
⊦ ∀l n.
shiftRight (toWord l) n =
if length l ≤ width then
if length l ≤ n then toWord [] else toWord (drop n l)
else if width ≤ n then toWord []
else toWord (drop n (take width l))
Input Type Operators
- →
- bool
- Data
- List
- list
- List
- Number
- Natural
- natural
- Natural
Input Constants
- =
- select
- Data
- Bool
- ∀
- ∧
- ⇒
- ∃
- ∃!
- ∨
- ¬
- cond
- ⊥
- ⊤
- List
- ::
- @
- []
- drop
- head
- interval
- length
- map
- nth
- replicate
- tail
- take
- zipWith
- Bool
- Number
- Natural
- *
- +
- -
- <
- ≤
- ^
- bit0
- bit1
- div
- divides
- even
- mod
- odd
- suc
- zero
- Natural
Assumptions
⊦ ⊤
⊦ ¬⊥ ⇔ ⊤
⊦ ¬⊤ ⇔ ⊥
⊦ even 0 ⇔ ⊤
⊦ odd 0 ⇔ ⊥
⊦ length [] = 0
⊦ bit0 0 = 0
⊦ ∀t. t ⇒ t
⊦ ∀n. 0 ≤ n
⊦ ∀n. n ≤ n
⊦ ⊥ ⇔ ∀p. p
⊦ ∀t. t ∨ ¬t
⊦ ∀n. 0 < suc n
⊦ ∀n. n < suc n
⊦ ∀n. n ≤ suc n
⊦ (¬) = λp. p ⇒ ⊥
⊦ (∃) = λp. p ((select) p)
⊦ ∀t. (∀x. t) ⇔ t
⊦ ∀t. (λx. t x) = t
⊦ (∀) = λp. p = λx. ⊤
⊦ ∀x. replicate 0 x = []
⊦ ∀t. ¬¬t ⇔ t
⊦ ∀t. (⊤ ⇔ t) ⇔ t
⊦ ∀t. (t ⇔ ⊤) ⇔ t
⊦ ∀t. ⊥ ∧ t ⇔ ⊥
⊦ ∀t. ⊤ ∧ t ⇔ t
⊦ ∀t. t ∧ ⊥ ⇔ ⊥
⊦ ∀t. t ∧ ⊤ ⇔ t
⊦ ∀t. t ∧ t ⇔ t
⊦ ∀t. ⊥ ⇒ t ⇔ ⊤
⊦ ∀t. ⊤ ⇒ t ⇔ t
⊦ ∀t. t ⇒ ⊤ ⇔ ⊤
⊦ ∀t. ⊥ ∨ t ⇔ t
⊦ ∀t. ⊤ ∨ t ⇔ ⊤
⊦ ∀t. t ∨ ⊥ ⇔ t
⊦ ∀t. t ∨ ⊤ ⇔ ⊤
⊦ ∀n. ¬(suc n = 0)
⊦ ∀n. even n ∨ odd n
⊦ ∀m. m < 0 ⇔ ⊥
⊦ ∀n. 0 * n = 0
⊦ ∀n. 0 + n = n
⊦ ∀m. m + 0 = m
⊦ ∀m. m - 0 = m
⊦ ∀n. n - n = 0
⊦ ∀m. interval m 0 = []
⊦ ∀l. [] @ l = l
⊦ ∀l. drop 0 l = l
⊦ ∀f. map f [] = []
⊦ ∀t. (⊥ ⇔ t) ⇔ ¬t
⊦ ∀t. (t ⇔ ⊥) ⇔ ¬t
⊦ ∀t. t ⇒ ⊥ ⇔ ¬t
⊦ ∀n. even (2 * n)
⊦ ∀n. bit1 n = suc (bit0 n)
⊦ ∀n. ¬even n ⇔ odd n
⊦ ∀n. ¬odd n ⇔ even n
⊦ ∀m. m ^ 0 = 1
⊦ ∀m. m * 1 = m
⊦ ∀n. n ^ 1 = n
⊦ ∀n. n div 1 = n
⊦ ∀n. n mod 1 = 0
⊦ ∀m. 1 * m = m
⊦ ∀l. take (length l) l = l
⊦ ∀m n. m ≤ m + n
⊦ ∀m n. n ≤ m + n
⊦ (⇒) = λp q. p ∧ q ⇔ p
⊦ ∀t. (t ⇔ ⊤) ∨ (t ⇔ ⊥)
⊦ ∀n. odd (suc (2 * n))
⊦ ∀m. suc m = m + 1
⊦ ∀n. even (suc n) ⇔ ¬even n
⊦ ∀m. m ≤ 0 ⇔ m = 0
⊦ ∀t1 t2. (if ⊥ then t1 else t2) = t2
⊦ ∀t1 t2. (if ⊤ then t1 else t2) = t1
⊦ ∀h t. head (h :: t) = h
⊦ ∀h t. tail (h :: t) = t
⊦ ∀n x. length (replicate n x) = n
⊦ ∀m n. length (interval m n) = n
⊦ ∀n. 0 < n ⇔ ¬(n = 0)
⊦ ∀n. bit0 (suc n) = suc (suc (bit0 n))
⊦ ∀x y. x = y ⇔ y = x
⊦ ∀x y. x = y ⇒ y = x
⊦ ∀h t. nth 0 (h :: t) = h
⊦ ∀t1 t2. t1 ∧ t2 ⇔ t2 ∧ t1
⊦ ∀t1 t2. t1 ∨ t2 ⇔ t2 ∨ t1
⊦ ∀m n. m * n = n * m
⊦ ∀m n. m + n = n + m
⊦ ∀m n. m = n ⇒ m ≤ n
⊦ ∀m n. m < n ⇒ m ≤ n
⊦ ∀m n. m ≤ n ∨ n ≤ m
⊦ ∀m n. m + n - m = n
⊦ ∀l f. length (map f l) = length l
⊦ ∀n. 2 * n = n + n
⊦ ∀h t. length (h :: t) = suc (length t)
⊦ ∀m n. ¬(m < n ∧ n ≤ m)
⊦ ∀m n. ¬(m ≤ n ∧ n < m)
⊦ ∀m n. ¬(m < n) ⇔ n ≤ m
⊦ ∀m n. ¬(m ≤ n) ⇔ n < m
⊦ ∀m n. m < suc n ⇔ m ≤ n
⊦ ∀m n. suc m ≤ n ⇔ m < n
⊦ ∀m. m = 0 ∨ ∃n. m = suc n
⊦ (∧) = λp q. (λf. f p q) = λf. f ⊤ ⊤
⊦ ∀n. even n ⇔ n mod 2 = 0
⊦ ∀n. ¬(n = 0) ⇒ 0 mod n = 0
⊦ ∀n. ¬(n = 0) ⇒ n mod n = 0
⊦ ∀p. ¬(∀x. p x) ⇔ ∃x. ¬p x
⊦ (∃) = λp. ∀q. (∀x. p x ⇒ q) ⇒ q
⊦ ∀t1 t2. ¬t1 ⇒ ¬t2 ⇔ t2 ⇒ t1
⊦ ∀m n. m < n ⇒ m div n = 0
⊦ ∀m n. m < n ⇒ m mod n = m
⊦ ∀m n. m + suc n = suc (m + n)
⊦ ∀m n. suc m + n = suc (m + n)
⊦ ∀m n. m < m + n ⇔ 0 < n
⊦ ∀m n. suc m = suc n ⇔ m = n
⊦ ∀m n. suc m < suc n ⇔ m < n
⊦ ∀m n. suc m ≤ suc n ⇔ m ≤ n
⊦ ∀m n. m + n = m ⇔ n = 0
⊦ ∀n. odd n ⇔ n mod 2 = 1
⊦ ∀n. 0 ^ n = if n = 0 then 1 else 0
⊦ ∀x n. replicate (suc n) x = x :: replicate n x
⊦ ∀m n. even (m * n) ⇔ even m ∨ even n
⊦ ∀m n. even (m + n) ⇔ even m ⇔ even n
⊦ ∀m n. m ^ suc n = m * m ^ n
⊦ ∀m n. ¬(n = 0) ⇒ m mod n < n
⊦ ∀m n. ¬(n = 0) ⇒ m div n ≤ m
⊦ ∀m n. ¬(n = 0) ⇒ m mod n ≤ m
⊦ ∀l m. length (l @ m) = length l + length m
⊦ ∀m n. m ≤ n ⇔ ∃d. n = m + d
⊦ ∀f g. (∀x. f x = g x) ⇔ f = g
⊦ (∨) = λp q. ∀r. (p ⇒ r) ⇒ (q ⇒ r) ⇒ r
⊦ ∀m n. m ≤ n ⇔ m < n ∨ m = n
⊦ ∀m n. n ≤ m ⇒ n + (m - n) = m
⊦ ∀m n. n ≤ m ⇒ m - n + n = m
⊦ ∀m n. interval m (suc n) = m :: interval (suc m) n
⊦ ∀m n. m ≤ n ∧ n ≤ m ⇔ m = n
⊦ ∀n l. n ≤ length l ⇒ length (take n l) = n
⊦ ∀p. (∀x y. p x y) ⇔ ∀y x. p x y
⊦ ∀p q. p ∨ (∃x. q x) ⇔ ∃x. p ∨ q x
⊦ ∀m n. ¬(m = 0) ⇒ m * n div m = n
⊦ ∀m n. ¬(m = 0) ⇒ m * n mod m = 0
⊦ ∀x y z. x = y ∧ y = z ⇒ x = z
⊦ ∀t1 t2 t3. (t1 ∨ t2) ∨ t3 ⇔ t1 ∨ t2 ∨ t3
⊦ ∀n x i. i < n ⇒ nth i (replicate n x) = x
⊦ ∀m n p. m * (n * p) = m * n * p
⊦ ∀m n p. m + (n + p) = m + n + p
⊦ ∀m n p. m + n < m + p ⇔ n < p
⊦ ∀m n p. n + m < p + m ⇔ n < p
⊦ ∀m n p. m + n ≤ m + p ⇔ n ≤ p
⊦ ∀m n p. m < n ∧ n < p ⇒ m < p
⊦ ∀m n p. m < n ∧ n ≤ p ⇒ m < p
⊦ ∀m n p. m ≤ n ∧ n < p ⇒ m < p
⊦ ∀m n p. m ≤ n ∧ n ≤ p ⇒ m ≤ p
⊦ ∀l h t. (h :: t) @ l = h :: t @ l
⊦ ∀p. (∀x. ∃y. p x y) ⇔ ∃y. ∀x. p x (y x)
⊦ ∀m n. n < m ⇒ suc (m - suc n) = m - n
⊦ ∀m n. n ≤ m ⇒ (m - n = 0 ⇔ m = n)
⊦ ∀m n. m ≤ suc n ⇔ m = suc n ∨ m ≤ n
⊦ ∀m n. m * n = 0 ⇔ m = 0 ∨ n = 0
⊦ ∀f h t. map f (h :: t) = f h :: map f t
⊦ ∀P. P 0 ∧ (∀n. P n ⇒ P (suc n)) ⇒ ∀n. P n
⊦ ∀a b. ¬(a = 0) ⇒ (divides a b ⇔ b mod a = 0)
⊦ ∀m n. ¬(n = 0) ⇒ (m div n = 0 ⇔ m < n)
⊦ ∀m n. ¬(n = 0) ⇒ m mod n mod n = m mod n
⊦ ∀m n. m ^ n = 0 ⇔ m = 0 ∧ ¬(n = 0)
⊦ ∀m n i. i < n ⇒ nth i (interval m n) = m + i
⊦ ∀m n p. m * (n + p) = m * n + m * p
⊦ ∀m n p. m ^ (n + p) = m ^ n * m ^ p
⊦ ∀m n p. (m + n) * p = m * p + n * p
⊦ (∃!) = λp. (∃) p ∧ ∀x y. p x ∧ p y ⇒ x = y
⊦ ∀b f x y. f (if b then x else y) = if b then f x else f y
⊦ ∀p q. (∀x. p x ∧ q x) ⇔ (∀x. p x) ∧ ∀x. q x
⊦ ∀p q. (∃x. p x) ∨ (∃x. q x) ⇔ ∃x. p x ∨ q x
⊦ ∀e f. ∃!fn. fn 0 = e ∧ ∀n. fn (suc n) = f (fn n) n
⊦ ∀m n. ¬(n = 0) ⇒ (m div n) * n + m mod n = m
⊦ ∀P. P [] ∧ (∀a0 a1. P a1 ⇒ P (a0 :: a1)) ⇒ ∀x. P x
⊦ ∀h t n. n < length t ⇒ nth (suc n) (h :: t) = nth n t
⊦ ∀n h t. n ≤ length t ⇒ drop (suc n) (h :: t) = drop n t
⊦ ∀m n p. m * n = m * p ⇔ m = 0 ∨ n = p
⊦ ∀m n p. m * n ≤ m * p ⇔ m = 0 ∨ n ≤ p
⊦ ∀f l i. i < length l ⇒ nth i (map f l) = f (nth i l)
⊦ ∀m n p. m * n < m * p ⇔ ¬(m = 0) ∧ n < p
⊦ ∀NIL' CONS'.
∃fn. fn [] = NIL' ∧ ∀a0 a1. fn (a0 :: a1) = CONS' a0 a1 (fn a1)
⊦ ∀m n p. ¬(n = 0) ⇒ m * (p mod n) mod n = m * p mod n
⊦ ∀m n p. ¬(n * p = 0) ⇒ m div n div p = m div n * p
⊦ ∀m n p. ¬(n * p = 0) ⇒ m mod n * p mod n = m mod n
⊦ ∀n l i. n ≤ length l ∧ i < n ⇒ nth i (take n l) = nth i l
⊦ ∀m n q r. m = q * n + r ∧ r < n ⇒ m div n = q
⊦ ∀m n q r. m = q * n + r ∧ r < n ⇒ m mod n = r
⊦ ∀m n p. ¬(n = 0) ⇒ (m mod n) * (p mod n) mod n = m * p mod n
⊦ ∀a b n. ¬(n = 0) ⇒ (a mod n + b mod n) mod n = (a + b) mod n
⊦ ∀m n p. ¬(n * p = 0) ⇒ m div n mod p = m mod n * p div n
⊦ ∀l m.
length l = length m ∧ (∀i. i < length l ⇒ nth i l = nth i m) ⇒ l = m
⊦ ∀x m n. x ^ m ≤ x ^ n ⇔ if x = 0 then m = 0 ⇒ n = 0 else x = 1 ∨ m ≤ n
⊦ ∀k l m.
k < length l + length m ⇒
nth k (l @ m) = if k < length l then nth k l else nth (k - length l) m
⊦ ∀a b n.
¬(n = 0) ⇒
((a + b) mod n = a mod n + b mod n ⇔ (a + b) div n = a div n + b div n)